10.3 day 2 Calculus of Polar Curves

1. Photo by Vickie Kelly, 2007 Greg Kelly, Hanford High School, Richland, Washington 10.3 day 2 Calculus of Polar Curves Lady Bird Johnson Grove, Redwood National Park, California

2. Try graphing this on the TI-89.

3. To find the slope of a polar curve: We use the product rule here.

4. To find the slope of a polar curve:

5. Example:

6. Area Inside a Polar Graph: The length of an arc (in a circle) is given by r.q when q is given in radians. For a very small q, the curve could be approximated by a straight line and the area could be found using the triangle formula:

7. We can use this to find the area inside a polar graph.

8. Example: Find the area enclosed by:

10. Notes: To find the area between curves, subtract: Just like finding the areas between Cartesian curves, establish limits of integration where the curves cross.

11. When finding area, negative values of r cancel out: Area of one leaf times 4: Area of four leaves:

12. To find the length of a curve: Remember: For polar graphs: If we find derivatives and plug them into the formula, we (eventually) get: So:

13. There is also a surface area equation similar to the others we are already familiar with: When rotated about the x-axis: p